Answer: In 1518, a conformal mapping z f (w) from the upper half-plane v 0 to a region R
Chapter 20, Problem 17(choose chapter or problem)
In Problems 15–18, a conformal mapping \(z=f(w)\) from the upper half-plane \(v \geq 0\) to a region R in the z-plane is given and the flow in R with complex potential \(G(z)=f^{-1}(z)\) is constructed.
(a) Verify that the boundary of R is a streamline for the flow.
(b) Find a parametric representation for the streamlines of the flow.
(c) Use a graphing utility to sketch the streamlines of the flow.
M-2 in Appendix IV; use \(a=1\)
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